| 非自伴算子代数间的等距代数同构 |
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| 引用本文: | 纪培胜.非自伴算子代数间的等距代数同构[J].数学学报,1996,39(4):477-482. |
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| 作者姓名: | 纪培胜 |
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| 作者单位: | 中国科学院数学研究所 |
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| 摘 要: | 设Gi是满足第二可数性公理的、Hausdorff的、顺从的、r-离散的、主的局部紧群胚,并且有一个紧开G-集覆盖;设Pi是Gi中含G_i ̄0的开闭集,且满足及相应的模是具有性质DC的C(Gi)的子代数(i=1,2).本文证明从A(P1)到A(P2)上的每一个等距代数同构可以扩张成从C(G1)到C(G2)上的C-同构,进一步,可以对C(G2)重新坐标化,使得这个C-同构可由一个群胚同构生成.
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| 关 键 词: | 群胚,性质DC,等距代数同构 |
| 收稿时间: | 1994-10-13 |
Isometrically Algebraic Isomorphisms between Two Non-self-adjoint Operator Algebras |
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| Ji Peisheng.Isometrically Algebraic Isomorphisms between Two Non-self-adjoint Operator Algebras[J].Acta Mathematica Sinica,1996,39(4):477-482. |
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| Authors: | Ji Peisheng |
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| Institution: | Ji Peisheng (Institute of Mathematics, Academia Sinica, Beijing 100080, China) |
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| Abstract: | It is shown that if Pi is a clopen subset of Gi containing with Pi Pi-1=Gi inthe amenable, r-discrete, principal local compact groupoid Gi which has a cover of compact openG-sets, and A(Pi) is a subalgebra with property DC of C*(Gi) (i=1, 2), then every isometricallyalgebraic isomorphism from A(P1) onto A(P2) can be extended to a C*-isomorphism from C* (G1)onto C*(G2). Moreover, we can coordinate C*(G2) to be C*(G'2) such that this C*-isomorphismcan be implemented by a groupoid isomorphism from G1 onto G'2. |
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| Keywords: | Groupoid Property DC Isometrically algebraic isomorphism |
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